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The area of a rectangular trampoline is 135 ft2. The length of the trampoline is 6 ft greater than the width of the trampoline. This situation can be represented by the equation w2+6w−135=0. What is the

Christosc asked Dec 1, 2023

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Warpedspeed · Answer 1 · 2023-12-02T11:42:35+0000

Answer :

9 feet.

Explanation :

Given :

The area of a rectangular trampoline is 135 ft².
The length of the trampoline is 6 ft greater than the width of the trampoline.

To find :

The width of the trampoline.

Solution :

Let us assume the width of the rectangle as w and therefore the length becomes (w + 6) .

We know that,

${ \qquad \dashrightarrow \bf{Length * Width =Area _((rectangle)) }}$

Substituting the values in the formula :

${\qquad \sf \dashrightarrow (w + 6)w = 135}$

${\qquad \sf \dashrightarrow {w}^(2) + 6w = 135}$

${\qquad \sf \dashrightarrow {w}^(2) + 6w - 135 = 0}$

${\qquad \sf \dashrightarrow {w}^(2) + 15w - 9w - 135 = 0}$

${\qquad \sf \dashrightarrow {w}(w + 15) - 9(w + 15) = 0}$

${\qquad \sf \dashrightarrow (w + 15) (w - 9) = 0}$

${\qquad \sf \dashrightarrow (w + 15) = 0}$

${\qquad \sf \dashrightarrow w = - 15}$

${\qquad \sf \dashrightarrow (w - 9) = 0}$

${\qquad \sf \dashrightarrow w = 9}$

Whether, w = (– 15) or 9 .

The width of the rectangle cannot be negative therefore the width of the rectangle must be 9 feet .

Ryan Knight · Answer 2 · 2023-12-05T15:57:44+0000

$\bold{\huge{\blue{\underline{ Solution }}}}$

Given :-

The area of rectangular trampoline is 135ft².
The length of the trampoline is 6ft greater than the width of the trampoline .

To Find :-

We have to find the width of the trampoline

Let's Begin :-

We have,

Area of rectangular trampoline = 135ft²

Let the width of the rectangular trampoline be w

According to the question,

Length is 6ft greater than width

Therefore,

The length of the rectangular trampoline will be

$\sf{ = (W + 6 )ft }$

Now,

We know that,

$\bold{\blue{ Area\: of\: rectangle = Length × Breath }}$

Subsitute the required values,

$\sf{ 135 = w(w + 6 ) }$

$\sf{ 135 = w² + 6w}$

$\sf{ = w² + 6w - 135 }$

By factorization method,

$\sf{ = w² - 9w + 15w - 135 }$

$\sf{ = w( w - 9) + 15( w - 9)}$

$\sf{ = ( w + 15) ( w - 9)}$

Therefore,

Width of the rectangular trampoline

$\sf{ w = - 15 \: or\: w = 9 }$

[ Width of the rectangle can never be negative ]

Thus , The width of the rectangular trampoline is 9 feet

$\bold{\pink{ Hence\:, Option \:D\: is\: correct }}$

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Given :-

To Find :-

Let's Begin :-

Therefore,

Now,

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